ElementaryTopos

An open source physics library

create new user


Username:
Password:

forget your password?

Main Menu

Sections

Encyclopedia

Papers

Books

lectures

Talkback

Polls

Forums

Bug Reports

Feedback

Downloads

Snapshots

Information

Legalese

About

topos axioms

(Definition)

Definition 0.1 The two axioms that define an elementary topos, or a standard topos, as a special category $\tau$ are:

i. $\tau$ has finite limits
ii. $\tau$ has power objects $\Omega(A)$ for objects in $\tau$ .

To complete the axiomatic definition of topoi, one needs to add the ETAC axioms which allow one to define a category as an interpretation of ETAC. The above axioms imply that any topos has finite colimits, a subobject classifier (such as a Heyting logic algebra), as well as several other properties.

Alternative definitions of topoi have also been proposed, such as:

Definition 0.2 A topos is a category $\tau$ subject to the following axioms:

$\mathbb{T}_1$ . $\tau$ is cartesian closed
$\mathbb{T}_2$ . $\tau$ has a subobject classifier.

One can show that axioms i. and ii. also imply axioms $\mathbb{T}_1$ and $\mathbb{T}_2$ ; one notes that property $\mathbb{T}_2$ can also be expressed as the existence of a representable subobject functor.

Bibliography

1: R.J. Wood. 2004. Ordered Sets via Adjunctions, in Categorical Foundations.,
2: M. C. Pedicchio and W. Tholen, Eds. 2000. Cambridge, UK: Cambridge University Press.
3: W.F. Lawvere. 1963. Functorial Semantics of Algebraic Theories. Proc. Natl. Acad. Sci. USA, 50: 869-872
4: W. F. Lawvere. 1966. The Category of Categories as a Foundation for Mathematics. , In Proc. Conf. Categorical Algebra-La Jolla, 1965, Eilenberg, S et al., eds. Springer-Verlag: Berlin, Heidelberg and New York, pp. 1-20.
5: J. Lambek and P. J. Scott. Introduction to higher order categorical logic. Cambridge University Press.
6: S. Mac Lane. 1997. Categories for the Working Mathematician, 2nd ed. Springer-Verlag.
7: S. Mac Lane and I. Moerdijk. 1992. Sheaves and Geometry in Logic: A First Introduction to Topos Theory, Springer-Verlag: Berlin.

"topos axioms" is owned by bci1.